Respuesta :
Answer:
For this case we define the event A like this:
A= In a certain group of women one present red/green color blindness
And for this case we have the following probability
[tex] P(A) = 0.0085 [/tex] and that's equivalent to 0.85%
The complement rule on this case would be:
A' = In a certain group of women one NOT present red/green color blindness
And the probability associated to the complment is:
[tex] P(A') =1-0.0085=0.9915 [/tex] and that's equivalent to 99.15%
Step-by-step explanation:
Previous concepts
The complement rule is a theorem that provides a connection between the probability of an event and the probability of the complement of the event. Lat A the event of interest and A' the complement. The rule is defined by: [tex]P(A)+P(A') =1[/tex]
Solution to the problem
For this case we define the event A like this:
A= In a certain group of women one present red/green color blindness
And for this case we have the following probability
[tex] P(A) = 0.0085 [/tex] and that's equivalent to 0.85%
The complement rule on this case would be:
A' = In a certain group of women one NOT present red/green color blindness
And the probability associated to the complment is:
[tex] P(A') =1-0.0085=0.9915 [/tex] and that's equivalent to 99.15%
